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He stole @Admin's 67 Super Vaccine, chatGPT did the math so it must be true:


67-Step Vaccine Stacking – How Much Per Shot?

In-game rules

Base duration (D): 365 days
Number of doses (n): 67
Target span (T): 975 years = 975 · 365.2425 days

Let

r = per-shot multiplier we need.

Total compounded protection for 67 shots


Required immunity length


Isolate the quotequote](r^{67} – 1)/(r – 1) = T/D[/quote]

Solve numerically for the 67-dose curve


Convert to percentage gain per shot
quote · 100 % ≈ 10.8 %[/quote]

Thus each of the 67 vaccines must be roughly
10.8 % stronger than the previous one, giving exactly
enough immunity to carry you from 2025 into the year 3000.

Solve numerically for the 67-dose curve


Convert to percentage gain per shot
quote · 100 % ≈ 10.8 %[/quote]

Thus each of the 67 vaccines must be roughly
10.8 % stronger than the previous one, giving exactly
enough immunity to carry you from 2025 into the year 3000.[/quote]
thats disaster

He stole @Admin's 67 Super Vaccine™, chatGPT did the math so it must be true:

_______________________________________________________

67-Step Vaccine Stacking – How Much Per Shot?

In-game rules

Base duration (D): 365 days
Number of doses (n): 67
Target span (T): 975 years = 975 · 365.2425 days

Let

r = per-shot multiplier we need.

Total compounded protection for 67 shots
D · Σ_{k=0}^{66} r^{k} = D · (r^{67} – 1)/(r – 1)

Required immunity length
D · (r^{67} – 1)/(r – 1) = T

Isolate the (r^{67} – 1)/(r – 1) = T/D

Solve numerically for the 67-dose curve
r ≈ 1.1083

Convert to percentage gain per shot
r · 100 % ≈ 10.8 %

Thus each of the 67 vaccines must be roughly
10.8 % stronger than the previous one, giving exactly
enough immunity to carry you from 2025 into the year 3000.